On an iterative method for solving absolute value equations
From MaRDI portal
Publication:1758043
DOI10.1007/s11590-011-0332-0zbMath1254.90149OpenAlexW2082483327MaRDI QIDQ1758043
Muhammad Aslam Noor, Javed Iqbal, Khalida Inayat Noor, Eisa A. Al-Said
Publication date: 7 November 2012
Published in: Optimization Letters (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11590-011-0332-0
Related Items (43)
A two-step Newton-type method for solving system of absolute value equations ⋮ A special shift splitting iteration method for absolute value equation ⋮ On Picard-SHSS iteration method for absolute value equation ⋮ A modified generalized Newton method for absolute value equations ⋮ A modified fixed point iteration method for solving the system of absolute value equations ⋮ An improvement on a class of fixed point iterative methods for solving absolute value equations ⋮ A Preconditioned AOR Iterative Method for the Absolute Value Equations ⋮ The relaxed nonlinear PHSS-like iteration method for absolute value equations ⋮ Iterative schemes induced by block splittings for solving absolute value equations ⋮ Numerical validation for systems of absolute value equations ⋮ A new three-term spectral subgradient method for solving absolute value equation ⋮ Residual iterative method for solving absolute value equations ⋮ A modified generalized SOR-like method for solving an absolute value equation ⋮ Minimum norm solution of the absolute value equations via simulated annealing algorithm ⋮ A three-step iterative method for solving absolute value equations ⋮ An inertial inverse-free dynamical system for solving absolute value equations ⋮ Inexact Newton-type method for solving large-scale absolute value equation \(Ax-|x|=b\). ⋮ Matrix multisplitting Picard-iterative method for solving generalized absolute value matrix equation ⋮ TWO CSCS-BASED ITERATION METHODS FOR SOLVING ABSOLUTE VALUE EQUATIONS ⋮ Generalized AOR method for solving absolute complementarity problems ⋮ SOR-like method for a new generalized absolute value equation ⋮ Unnamed Item ⋮ The Picard-HSS iteration method for absolute value equations ⋮ Picard splitting method and Picard CG method for solving the absolute value equation ⋮ A modified SOR-like method for absolute value equations associated with second order cones ⋮ A new class of conjugate gradient methods for unconstrained smooth optimization and absolute value equations ⋮ Some techniques for solving absolute value equations ⋮ A modified multivariate spectral gradient algorithm for solving absolute value equations ⋮ Convergent conditions of the generalized Newton method for absolute value equation over second order cones ⋮ SOR-like iteration method for solving absolute value equations ⋮ A dynamic model to solve the absolute value equations ⋮ Bounds for the solutions of absolute value equations ⋮ Levenberg-Marquardt method for solving systems of absolute value equations ⋮ The new iteration algorithm for absolute value equation ⋮ Newton-based matrix splitting method for generalized absolute value equation ⋮ An inverse-free dynamical system for solving the absolute value equations ⋮ A quadratically convergent descent method for the absolute value equation \(Ax + B |x| = b\) ⋮ A new two-step iterative method for solving absolute value equations ⋮ Modified HS conjugate gradient method for solving generalized absolute value equations ⋮ The Picard-HSS-SOR iteration method for absolute value equations ⋮ Generalized symmetric accelerated over relaxation method for solving absolute value complementarity problems ⋮ Absolute value equations with tensor product structure: unique solvability and numerical solution. ⋮ On the solvability and Picard-type method for absolute value matrix equations
Cites Work
- Unnamed Item
- Unnamed Item
- A new iterative method for solving linear systems
- Absolute value equations
- Absolute value programming
- A generalized Newton method for absolute value equations
- Extended general variational inequalities
- NP-completeness of the linear complementarity problem
- \(H\)-splittings and two-stage iterative methods
- Solution of symmetric linear complementarity problems by iterative methods
- Some aspects of variational inequalities
- An algorithm for computing all solutions of an absolute value equation
- The linear complementarity problem as a separable bilinear program
- Some developments in general variational inequalities
- Introduction to global optimization
- Absolute value equation solution via concave minimization
- Complementary pivot theory of mathematical programming
- A theorem of the alternatives for the equationAx+B|x| =b
This page was built for publication: On an iterative method for solving absolute value equations
